/ | Elliptic Partial Differential Equations of Second Order | Springer | Reprint of the 2nd ed. Berlin Heidelberg New York 1983. Cor
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529 pages. Dimensions: 9.1in. x 6.1in. x 1.2in.From the reviews: This is a book of interest to any having to work with differential equations, either as a reference or as a book to learn from. The authors have taken trouble to make the treatment self-contained. It (is) suitable required reading for a PhD student. --New Zealand Mathematical Society, 1985 This item ships from multiple locations. Your book may arrive from Roseburg,OR, La Vergne,TN.

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Chapter 1. Introduction Part I: Linear Equations Chapter 2. Laplace's Equation 2.1 The Mean Value Inequalities 2.2 Maximum and Minimum Principle 2.3 The Harnack Inequality 2.4 Green's Representation 2.5 The Poisson Integral 2.6 Convergence Theorems 2.7 Interior Estimates of Derivatives 2.8 The Dirichlet Problem the Method of Subharmonic Functions 2.9 Capacity Problems Chapter 3. The Classical Maximum Principle 3.1 The Weak Maximum Principle 3.2 The Strong Maximum Principle 3.3 Apriori Bounds 3.4 Gradient Estimates for Poisson's Equation 3.5 A Harnack Inequality 3.6 Operators in Divergence Form Notes Problems Chapter 4. Poisson's Equation and Newtonian Potential 4.1 Hölder Continuity 4.2 The Dirichlet Problem for Poisson's Equation 4.3 Hölder Estimates for the Second Derivatives 4.4 Estimates at the Boundary 4.5 Hölder Estimates for the First Derivatives Notes Problems Chapter 5. Banach and Hilbert Spaces 5.1 The Contraction Mapping 5.2 The Method of Cintinuity 5.3 The Fredholm Alternative 5.4 Dual Spaces and Adjoints 5.5 Hilbert Spaces 5.6 The Projection Theorem 5.7 The Riesz Representation Theorem 5.8 The Lax-Milgram Theorem 5.9 The Fredholm Alternative in Hilbert Spaces 5.10 Weak Compactness Notes Problems Chapter 6. Classical Solutions the Schauder Approach 6.1 The Schauder Interior Estimates 6.2 Boundary and Global Estimates 6.3 The Dirichlet Problem 6.4 Interior and Boundary Regularity 6.5 An Alternative Approach 6.6 Non-Uniformly Elliptic Equations 6.7 Other Boundary Conditions the Obliue Derivative Problem 6.8 Appendix 1: Interpolation Inequalities 6.9 Appendix 2: Extension Lemmas Notes Problems Chapter 7. Sobolev Spaces 7.1 Lp spaces 7.2 Regularization and Approximation by Smooth Functions 7.3 Weak Derivatives 7.4 The Chain Rule 7.5 The W(k,p) Spaces 7.6 DensityTheorems 7.7 Imbedding Theorems 7.8 Potential Estimates and Imbedding Theorems 7.9 The Morrey and John-Nirenberg Estimes 7.10 Compactness Results 7.11 Difference Quotients 7.12 Extension and Interpolation Notes Problems Chapter 8 Generalized Solutions and Regularity 8.1 The Weak Maximum Principle 8.2 Solvability of the Dirichlet Problem 8.3 Diferentiability of Weak Solutions 8.4 Global Regularity 8.5 Global Boundedness of Weak Solutions 8.6 Local Properties of Weak Solutions 8.7 The Strong Maximum Principle 8.8 The Harnack Inequality 8.9 Hölder Continuity 8.10 Local Estimates at the Boundary 8.11 Hölder Estimates for the First Derivatives 8.12 The Eigenvalue Problem Notes Problems Chapter 9. Strong Solutions 9.1 Maximum Princiles for Strong Solutions 9.2 Lp Estimates: Preliminary Analysis 9.3 The Marcinkiewicz Interpolation Theorem 9.4 The Calderon-Zygmund Inequality 9.5 Lp Estimates 9.6 The Dirichlet Problem 9.7 A Local Maximum Principle 9.8 Hölder and Harnack Estimates 9.9 Local Estimates at the Boundary Notes Problems Part II: Quasilinear Equations Chapter 10. Maximum and Comparison Principles 10.1 The Comparison Principle 10.2 Maximum Principles 10.3 A Counterexample 10.4 Comparison Principles for Divergence Form Operators 10.5 Maximum Principles for Divergence Form Operators Notes Problems Chapter 11. Topological Fixed Point Theorems and Their Application 11.1 The Schauder Fixes Point Theorem 11.2 The Leray-Schauder Theorem: a Special Case 11.3 An Application 11.4 The Leray-Schauder Fixed Point Theorem 11.5 Variational Problems Notes Chapter 12. Equations in Two Variables 12.1 Quasiconformal Mappings 12.2 hölder Gradient Estimates for Linear Equations 12.3 The Dirichlet Problem for Uniformly Elliptic Equations 12.4 Non-Uniformly Elliptic Equations Notes Problems Chapter 13. Hölder Estimates for, 2001, Taschenbuch / Paperback, Neuware, H: 235mm, B: 155mm, 805g, 518, Internationaler Versand, Selbstabholung und Barzahlung, PayPal, offene Rechnung, Banküberweisung.

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9783540411604 This listing is a new book, a title currently in-print which we order directly and immediately from the publisher. For all enquiries, please contact Herb Tandree Philosophy Books directly - customer service is our primary goal.

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Publisher/Verlag: Springer, Berlin | Chapter 1. Introduction Part I: Linear EquationsChapter 2. Laplace's Equation2.1 The Mean Value Inequalities2.2 Maximum and Minimum Principle2.3 The Harnack Inequality2.4 Green's Representation2.5 The Poisson Integral2.6 Convergence Theorems2.7 Interior Estimates of Derivatives2.8 The Dirichlet Problem; the Method of Subharmonic Functions2.9 CapacityProblemsChapter 3. The Classical Maximum Principle3.1 The Weak Maximum Principle3.2 The Strong Maximum Principle3.3 Apriori Bounds3.4 Gradient Estimates for Poisson's Equation3.5 A Harnack Inequality3.6 Operators in Divergence FormNotesProblemsChapter 4. Poisson's Equation and Newtonian Potential4.1 Hölder Continuity4.2 The Dirichlet Problem for Poisson's Equation4.3 Hölder Estimates for the Second Derivatives4.4 Estimates at the Boundary4.5 Hölder Estimates for the First DerivativesNotesProblemsChapter 5. Banach and Hilbert Spaces5.1 The Contraction Mapping5.2 The Method of Cintinuity5.3 The Fredholm Alternative5.4 Dual Spaces and Adjoints5.5 Hilbert Spaces5.6 The Projection Theorem5.7 The Riesz Representation Theorem5.8 The Lax-Milgram Theorem5.9 The Fredholm Alternative in Hilbert Spaces5.10 Weak CompactnessNotesProblemsChapter 6. Classical Solutions; the Schauder Approach6.1 The Schauder Interior Estimates6.2 Boundary and Global Estimates6.3 The Dirichlet Problem6.4 Interior and Boundary Regularity6.5 An Alternative Approach6.6 Non-Uniformly Elliptic Equations6.7 Other Boundary Conditions; the Obliue Derivative Problem 6.8 Appendix 1: Interpolation Inequalities6.9 Appendix 2: Extension LemmasNotesProblemsChapter 7. Sobolev Spaces7.1 L^p spaces7.2 Regularization and Approximation by Smooth Functions7.3 Weak Derivatives7.4 The Chain Rule7.5 The W^(k,p) Spaces7.6 DensityTheorems7.7 Imbedding Theorems7.8 Potential Estimates and Imbedding Theorems7.9 The Morrey and John-Nirenberg Estimes7.10 Compactness Results7.11 Difference Quotients7.12 Extension and InterpolationNotesProblemsChapter 8 Generalized Solutions and Regularity8.1 The Weak Maximum Principle8.2 Solvability of the Dirichlet Problem8.3 Diferentiability of Weak Solutions8.4 Global Regularity8.5 Global Boundedness of Weak Solutions8.6 Local Properties of Weak Solutions8.7 The Strong Maximum Principle8.8 The Harnack Inequality8.9 Hölder Continuity8.10 Local Estimates at the Boundary8.11 Hölder Estimates for the First Derivatives8.12 The Eigenvalue ProblemNotesProblemsChapter 9. Strong Solutions9.1 Maximum Princiles for Strong Solutions9.2 L^p Estimates: Preliminary Analysis9.3 The Marcinkiewicz Interpolation Theorem9.4 The Calderon-Zygmund Inequality9.5 L^p Estimates9.6 The Dirichlet Problem9.7 A Local Maximum Principle9.8 Hölder and Harnack Estimates9.9 Local Estimates at the BoundaryNotesProblemsPart II: Quasilinear EquationsChapter 10. Maximum and Comparison Principles 10.1 The Comparison Principle 10.2 Maximum Principles 10.3 A Counterexample 10.4 Comparison Principles for Divergence Form Operators 10.5 Maximum Principles for Divergence Form Operators NotesProblemsChapter 11. Topological Fixed Point Theorems and Their Application11.1 The Schauder Fixes Point Theorem11.2 The Leray-Schauder Theorem: a Special Case11.3 An Application11.4 The Leray-Schauder Fixed Point Theorem11.5 Variational ProblemsNotesChapter 12. Equations in Two Variables12.1 Quasiconformal Mappings12.2 hölder Gradient Estimates for Linear Equations12.3 The Dirichlet Problem for Uniformly Elliptic Equations12.4 Non-Uniformly Elliptic EquationsNotesProblemsChapter 13. Hölder Estimates for | Format: Paperback | Language/Sprache: english | 805 gr | 518 pp.

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Paperback, Ausgabe: Reprint of the 2nd ed. Berlin Heidelberg New York 1983. Corr. 3rd printing 1998, Label: Springer, Springer, Produktgruppe: Book, Publiziert: 2001-03-01, Freigegeben: 2013-10-04, Studio: Springer, Verkaufsrang: 303077.